Spectral sequence of an isometric action

Abstract

We consider a free smooth action G × M M of a connected compact Lie group G on a manifold M. We examine the Cartan filtration of the complex of differential forms of M. The associated spectral sequence Ep,q_r converges to the cohomology of M. It is well known that the second page Ep,q_2 of this spectral sequence is given by H^p (M/G) H^q ( g), where g denotes the Lie algebra of G. In this note, we provide a straightforward proof of this fact without using Mayer-Vietoris, harmonic operators, or other such methods found in existing proofs. In fact, we extend this result to the case where the action is locally free and G is not compact, under the hypothesis that extends to a smooth action of a compact Lie group K. The compactness of K is a crucial aspect of our proof. When G is not compact, the cohomology H^p (M/G) is not the cohomology of the orbit space M/G, which may be a topologically wild space, but rather the basic cohomology of the foliation determined by the action of G.